grandes-ecoles 2018 Q8

grandes-ecoles · France · x-ens-maths__psi Invariant lines and eigenvalues and vectors Compute eigenvalues of a given matrix

Let $\lambda$ be an eigenvalue of $A _ { n }$.
(a) Show that the complex roots $r _ { 1 } , r _ { 2 }$ of the polynomial
$$P ( r ) = r ^ { 2 } - ( 2 - \lambda ) r + 1$$
are distinct and conjugate.
(b) We set $r _ { 1 } = \overline { r _ { 2 } } = \rho e ^ { i \theta }$ with $\rho > 0$ and $\theta \in \mathbb { R }$.
Show that we necessarily have $\sin ( ( n + 1 ) \theta ) = 0$ and $\rho = 1$.

Let $\lambda$ be an eigenvalue of $A _ { n }$.

(a) Show that the complex roots $r _ { 1 } , r _ { 2 }$ of the polynomial

$$P ( r ) = r ^ { 2 } - ( 2 - \lambda ) r + 1$$

are distinct and conjugate.

(b) We set $r _ { 1 } = \overline { r _ { 2 } } = \rho e ^ { i \theta }$ with $\rho > 0$ and $\theta \in \mathbb { R }$.

Show that we necessarily have $\sin ( ( n + 1 ) \theta ) = 0$ and $\rho = 1$.

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